On the Exponent of the Ideal Class Groups of Complex Quadratic Fields
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Publication:5665265
DOI10.2307/2037547zbMath0252.12002OpenAlexW4253490955MaRDI QIDQ5665265
H. H. Kisilevsky, David W. Boyd
Publication date: 1972
Published in: Proceedings of the American Mathematical Society (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.2307/2037547
Related Items (16)
The class groups of the imaginary Abelian number fields with Galois group (ℤ/2ℤ)n ⋮ Exponents of the class groups of imaginary Abelian number fields ⋮ Modular forms and \(K3\) surfaces ⋮ Imaginary quadratic fields with class group exponent 5 ⋮ Bounds for the ℓ-torsion in class groups ⋮ Partitions associated to class groups of imaginary quadratic number fields ⋮ Missing Class Groups and Class Number Statistics for Imaginary Quadratic Fields ⋮ Imaginary quadratic number fields with class groups of small exponent ⋮ On the independence of Heegner points associated to distinct quadratic imaginary fields ⋮ ON MODpREPRESENTATIONS WHICH ARE DEFINED OVERp: II ⋮ Generalised Kummer constructions and Weil restrictions ⋮ An algebraic approach to the growth of class numbers of binary quadratic lattices ⋮ CM newforms with rational coefficients ⋮ New types of quadratic fields having three invariants divisible by 3 ⋮ The imaginary abelian number fields of $2$-power degrees with ideal class groups of exponent $≤2$ ⋮ Imaginary multiquadratic number fields with class group of exponent $3$ and $5$
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